- Autor(in)
- Referenz
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1 Dirac, P. A. M., Phys. Rev. 74 (1948) 817.
2 Schwinger, J., Phys. Rev. 173 (1968) 1536.
3 Pham Mau Quan, Introduction à la geometrie des varietes differentiables Dunod, Paris 1969.
4 Lipkin, H. J., Lie Groups for Pedestrians North-Holland Publishing Co. Amsterdam.
- Seitenbereich
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0337 - 0346
- Zusammenfsg.
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We discuss the concept of Schwinger, which starts with the hypothesis of the existence of magnetical monopoles and results in a baryon model with magnetically charged constituents. Especially we analyse the mathematical consistency of such a theory. which admits a connection between some magnetically charged "quarks" and the homogeneous Maxwell-equations ∂<sub>v</sub>*<I>F</I><sup>μv</sup>(<I>x</I><sup>u</sup>) = 0, which, displaying a lack of symmetry with respect to the inhomogeneous one, ∂<sub>v</sub><I>F</I><sup>μv</sup>(<I>x</I><sup>u</sup>) = 4∂<I>j</I><sup>μ</sup>, are replaced by ∂*<I>j</I><sup>μv</sup>. Here *<I>j</I><sup>μ</sup>(<I>x</I><sup>μ</sup>) means a conserved magnetic current which provides a monopole source for the magnetic field.
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